• Title of article

    MODULE GENERALIZED DERIVATIONS ON TRIANGULAUR BANACH ALGEBRAS

  • Author/Authors

    MOSADEQ ، MAYSAM - ISLAMIC AZAD UNIVERSITY, BEHBAHAN BRANCH

  • Pages
    10
  • From page
    43
  • To page
    52
  • Abstract
    Let A1, A2 be unital Banach algebras and X be an A1-A2- module. Applying the concept of module maps, (inner) module generalized derivations and eneralized first cohomology groups, we present several results concerning the relations between module generalized derivations from Ai into the dual space A*i (for i = 1; 2) and such derivations from the triangular Banach algebra of the form T := (A1 X 0 A2) into the associated triangular T - bimodule T * of the form T * := (A*1 X* 0 A*2 ). In particular, we show that the so-called generalized first cohomology group from T to T * is isomorphic to the directed sum of the generalized first cohomology group from A1 to A*1 and the generalized first cohomology group from A2 to A*2.
  • Keywords
    Generalized amenable Banach algebra , Generalized ffrst cohomology group , Module generalized derivation , Triangular Banach algebra
  • Journal title
    journal of mahani mathematical research center
  • Serial Year
    2013
  • Journal title
    journal of mahani mathematical research center
  • Record number

    2467254